Abstract

We give sufficient conditions for subsets to be precompact sets in variable Morrey spaces. Then we obtain the boundedness of the commutator generated by a singular integral operator and a BMO function on the variable Morrey spaces. Finally, we discuss the compactness of the commutator generated by a singular integral operator and a BMO function on the variable Morrey spaces.

1. Introduction

Let the Calderón-Zygmund singular integral operator be defined bywhere is a measurable function on and satisfies the following conditions: (i) is a homogeneous function of degree zero on ; that is,(ii) has mean zero on ; that is,Here is the unit sphere in and is the area measure on it.

For a function (the set of all locally integrable functions on ), let be the corresponding multiplication operator defined by for a measurable function . Then the commutator between and is denoted by for suitable functions Denote the bounded mean oscillation function space byhere and in the sequel

It is well known that commutators play a very important role in harmonic analysis and PDEs. Indeed, Coifman et al. [1] characterized the -boundedness of , where are the Reisz transforms and Using this characterization, the authors of [1] obtained a decomposition theorem of the real Hardy spaces Uchiyama [2] and Janson [3] showed that the Riesz transform may be replaced by the Calderón-Zygmund singular integral operator as in (1). Coifman et al. generalized the boundedness results of to Hardy spaces and gave important applications to some nonlinear PDEs in [4]. The characterization of -compactness of was obtained by Uchiyama [2]. We remark that the interest in the compactness of in complex analysis is from the connection between the commutators and the Hankel-type operators; see [5]. In recent years, Chen et al. have considered the compactness of commutators in [6–8]. Specially, the results in [2] were generalized to Morrey spaces in [8]. The Morrey space was introduced by Morrey in 1938 and it is connected to certain problems in elliptic PDE [9]. After that the Morrey spaces were found to have many important applications to the Navier-Stokes equations (see [10]), the Schrödinger equations (see [11]), and potential theory (see [12–14]).

During last three decades, the theory of variable function spaces has developed quickly; see [15–40]. We claim that the list is not exhaust. The boundedness in variable function spaces of many classical operators from harmonic analysis has been obtained; see [18, 19, 41–44]. Motivated by these works, we will consider analogous results in [8] to variable exponent situation. The structure of this paper is as follows. In Section 2, we give sufficient conditions for a set to be a precompact set in a variable Morrey space. In Section 3, we obtain the boundedness of singular integrals and their commutator in variable Morrey spaces. In Section 4, we discuss compactness of commutators in variable Morrey spaces. The remainder of this section is some notions.

Let be a measurable subset in with , where as usual is the Lebesgue measure of . Let be a measurable function on with range in The variable exponent modulus is defined for measurable functions on by denotes the set of measurable functions on such that for some The set becomes a Banach function space when equipped with the normThese spaces are the so-called variable Lebesgue spaces. Denote by the set of measurable functions on with range in such that

For and for , the variable Morrey space is defined as the set of integrable functions on with the finite normwhere denotes a ball centered at with radius and is the volume of the unit ball in

2. Precompact Sets in Variable Morrey Spaces

In this section, we give a compactness criterion in variable Morrey spaces. We remark here that a compactness criterion for variable exponent Lebesgue spaces was given in [45].

Theorem 1. Let and for Suppose is a subset in satisfying the following conditions:(i)Norm boundedness uniformly is(ii)Translation continuity uniformly is(iii)Uniformly convergence at infinity iswhere Then is a precompact set in

To prove Theorem 1, we need the following two lemmas, which are well known; for example, see [46].

Lemma 2. A set is precompact in a Banach space if and only if it is totally bounded which means for every positive number there is a finite subset of points of such that where denotes a ball centered at with radius . The set is called an -net of

Lemma 3 (the Ascoli-Arzela theorem). Let be a bounded domain in . A subset of is precompact in if the following two conditions hold:(i)There exists a constant such that holds for every and (ii)For every , there exists such that for , , and

Now there is a position to prove Theorem 1.

Proof of Theorem 1. Let , we denote the mean of on byFor and Then by Hölder’s inequality and Fubini’s Theorem, for any and ,Thus,Therefore, to prove that is a precompact set, we need only to prove that is precompact for small By Lemma 2, it suffices to show that has finite -net for any To do so, firstly, by Lemma 3, we show that is precompact in for each , where For any , by Hölder’s inequality, since , and Therefore, are uniformly bounded functions by Condition (i). Then for ,Thus, by Condition (ii) and Lemma 3, is precompact in
Finally, we verify that has finite -net for each small positive For , there exist and such that and for each By Lemma 3, there exist such that is a finite -net in in the norm of Below we verify that is a finite -net in in the norm of
To finish the proof, we only need to show that, for , there is a such that for , Now, we choose such thatTo show (22), we consider into three cases.
Case  1.
If ,If ,Case  2. Thus, we haveCase  3. , and Hence,Here, can be estimated that by Cases and , respectively.
Therefore, has a finite -net in This completes the proof.

3. Boundedness of Singular Integrals and Their Commutators

To consider the boundedness of singular integrals, a fundamental operator is the Hardy-Littlewood maximal operator. Given a function , the maximal function is defined by where the supremum is taken over all cubes containing . It is well known that is bounded on , However, for any , need not be bounded in Let be the set of such that is bounded on For the set , we refer the reader to [19, 41] for details. If , we will use the following results.

Lemma 4 (see [22]). Let Then there exist depending only on and such that for balls in and all measurable subsets

Lemma 5 (see [22]). Let Then there exists a positive constant such that for balls in ,where and what follows is the conjugate exponent of , which means

Lemma 6 (see [23, 24]). Suppose , and then there exists a positive constant such that for each

Theorem 7. Let for Suppose is a linear or sublinear operator satisfyingIf , , where is as in Lemma 4 and the operator is bounded on , then is also bounded on That means where the constant is independent of